Shi-type estimates of the Ricci flow based on Ricci curvature

Abstract

We construct a uniform local bound of curvature operator from local bounds of Ricci curvature and injectivity radius among all n-dimensional Ricci flows. Thus new compactness theorems for the Ricci flow and Ricci solitons are derived. In particular, we show that every Ricci flow with |Ric|≤ K must satisfy |Rm|≤ Ct-1 for all t∈ (0,T], where C depends only on the dimension n and T depends on K and the injectivity radius injg(t). In the second part of this paper, we discuss the behavior of Ricci curvature and its derivative when the injectivity radius is thoroughly unknown. In particular, another Shi-type estimate for Ricci curvature is derived when the derivative of Ricci curvature is controlled by the derivative of scalar curvature.